Some sharp estimates for convex hypersurfaces of pinched normal curvature

Abstract

For a convex domain D bounded by the hypersurface ∂ D in a space of constant curvature we give sharp bounds on the width R-r of a spherical shell with radii R and r that can enclose ∂ D, provided that normal curvatures of ∂ D are pinched by two positive constants. Furthermore, in the Euclidean case we also present sharp estimates for the quotient R/r. From the obtained estimates we derive stability results for almost umbilical hypersurfaces in the constant curvature spaces.